The line bundles on the moduli of parabolic G-bundles over curves and their sections
Identifieur interne : 002518 ( Istex/Corpus ); précédent : 002517; suivant : 002519The line bundles on the moduli of parabolic G-bundles over curves and their sections
Auteurs : Yves Laszlo ; Christoph SorgerSource :
- Annales scientifiques de l'Ecole normale superieure [ 0012-9593 ] ; 1997.
English descriptors
- KwdEn :
- Algebra, Algebraic, Algebraic group, Analogous statement, Annales, Annales scientifiques, Base change, Basic representation, Beauville, Bore1 subgroup, Canonical, Canonical isomorphism, Central extension, Coarse moduli spaces, Cocycle, Cohomology, Conformal, Conformal blocks, Connectedness, Determinant, Determinant bundle, Determinant line bundle, Direct limit, Dominant weight, Dynkin, Dynkin index, Factorial, Faltings, Functor, Highest root, Highest weight, Homogeneous space, Injective, Irreducible, Isomorphic, Isomorphism, Kumar, Laszlo, Line bundle, Line bundles, Local sections, Modulus, Morphism, Morphisms, Mumford group, Narasimhan, Normale, Normale sup6rieure, Parabolic, Parameterized, Pfaffian, Pfaffian line bundle, Picard, Picard group, Picard groups, Projective, Pullback, Quotient, Resp, S6rie tome, Scientifiques, Simple connectedness, Simple roots, Sorger, Square root, Stacks, Standard parabolic subgroup, Standard representation, Structure group, Subgroup, Tome, Topology, Trivialization, Trivializations, Universal family, Usual cocycle condition, Vector bundles, Vector space, Verlinde formula.
- Teeft :
- Algebra, Algebraic, Algebraic group, Analogous statement, Annales, Annales scientifiques, Base change, Basic representation, Beauville, Bore1 subgroup, Canonical, Canonical isomorphism, Central extension, Coarse moduli spaces, Cocycle, Cohomology, Conformal, Conformal blocks, Connectedness, Determinant, Determinant bundle, Determinant line bundle, Direct limit, Dominant weight, Dynkin, Dynkin index, Factorial, Faltings, Functor, Highest root, Highest weight, Homogeneous space, Injective, Irreducible, Isomorphic, Isomorphism, Kumar, Laszlo, Line bundle, Line bundles, Local sections, Modulus, Morphism, Morphisms, Mumford group, Narasimhan, Normale, Normale sup6rieure, Parabolic, Parameterized, Pfaffian, Pfaffian line bundle, Picard, Picard group, Picard groups, Projective, Pullback, Quotient, Resp, S6rie tome, Scientifiques, Simple connectedness, Simple roots, Sorger, Square root, Stacks, Standard parabolic subgroup, Standard representation, Structure group, Subgroup, Tome, Topology, Trivialization, Trivializations, Universal family, Usual cocycle condition, Vector bundles, Vector space, Verlinde formula.
Abstract
Abstract: Let X be a complex, smooth, complete and connected curve and G be a complex simple and simply connected algebraic group. We compute the Picard group of the stack of quasi-parabolic G-bundles over X, describe explicitly its generators for classical G and G2 and then identify the corresponding spaces of global sections with the vacua spaces of Tsuchiya, Ueno and Yamada. The method uses the uniformization theorem which describes these stacks as double quotients of certain infinite dimensional algebraic groups. We describe also the dualizing bundle of the stack of G-bundles and show that it admits a unique square root, which we construct explicitly. If G is not simply connected, the square root depends on the choice of a theta-characteristic. These results about stacks allow to recover the Drezet-Narasimhan theorem (for the coarse moduli space) and to show an analogous statement when G = Sp2r. We prove also that the coarse moduli spaces of semi-stable SOr-bundles are not locally factorial for r ≥ 7.
Url:
DOI: 10.1016/S0012-9593(97)89929-6
Links to Exploration step
ISTEX:B3CF9F845D06279C40D7D9E46843832A9F73C6ACLe document en format XML
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We compute the Picard group of the stack of quasi-parabolic G-bundles over X, describe explicitly its generators for classical G and G2 and then identify the corresponding spaces of global sections with the vacua spaces of Tsuchiya, Ueno and Yamada. The method uses the uniformization theorem which describes these stacks as double quotients of certain infinite dimensional algebraic groups. We describe also the dualizing bundle of the stack of G-bundles and show that it admits a unique square root, which we construct explicitly. If G is not simply connected, the square root depends on the choice of a theta-characteristic. These results about stacks allow to recover the Drezet-Narasimhan theorem (for the coarse moduli space) and to show an analogous statement when G = Sp2r. We prove also that the coarse moduli spaces of semi-stable SOr-bundles are not locally factorial for r ≥ 7.</abstract><qualityIndicators><refBibsNative>true</refBibsNative><abstractWordCount>165</abstractWordCount><abstractCharCount>1020</abstractCharCount><keywordCount>0</keywordCount><score>8.98</score><pdfWordCount>11527</pdfWordCount><pdfCharCount>58131</pdfCharCount><pdfVersion>1.3</pdfVersion><pdfPageCount>27</pdfPageCount><pdfPageSize>576 x 756 pts</pdfPageSize></qualityIndicators><title>The line bundles on the moduli of parabolic G-bundles over curves and their sections</title><pii><json:string>S0012-9593(97)89929-6</json:string></pii><genre><json:string>research-article</json:string></genre><serie><title>Proceedings of the Hirzebruch 65 Conference on Algebraic Geometry</title><language><json:string>unknown</json:string></language></serie><host><title>Annales scientifiques de l'Ecole normale superieure</title><language><json:string>unknown</json:string></language><publicationDate>1997</publicationDate><issn><json:string>0012-9593</json:string></issn><pii><json:string>S0012-9593(00)X0003-1</json:string></pii><volume>30</volume><issue>4</issue><pages><first>499</first><last>525</last></pages><genre><json:string>journal</json:string></genre></host><namedEntities><unitex><date><json:string>1997</json:string></date><geogName></geogName><orgName></orgName><orgName_funder></orgName_funder><orgName_provider></orgName_provider><persName><json:string>C. 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We compute the Picard group of the stack of quasi-parabolic G-bundles over X, describe explicitly its generators for classical G and G2 and then identify the corresponding spaces of global sections with the vacua spaces of Tsuchiya, Ueno and Yamada. The method uses the uniformization theorem which describes these stacks as double quotients of certain infinite dimensional algebraic groups. We describe also the dualizing bundle of the stack of G-bundles and show that it admits a unique square root, which we construct explicitly. If G is not simply connected, the square root depends on the choice of a theta-characteristic. These results about stacks allow to recover the Drezet-Narasimhan theorem (for the coarse moduli space) and to show an analogous statement when G = Sp2r. We prove also that the coarse moduli spaces of semi-stable SOr-bundles are not locally factorial for r ≥ 7.</p></abstract><abstract xml:lang="fr"><p>Résumé: Soient X une courbe complexe, lisse, projective et connexe et G un groupe algébrique complexe, simple et simplement connexe. Nous calculons le groupe de Picard du champ des G-fibrés quasi-paraboliques sur X, décrivons explicitement ses générateurs pour G de type classique ou G2, puis identifions les espaces de sections globales correspondants avec les espaces de vacua de Tsuchiya, Ueno et Yamada. La méthode utilise le théorème d'uniformisation qui décrit ces champs comme doubles quotients de certains groupes algébriques de dimension infinie. Nous décrivons le fibré dualisant du champ des G-fibrés et montrons qu'il admet une unique racine carrée, que nous construisons explicitement. Si G n'est pas simplement connexe, la racine carrée dépend du choix d'une thêta-caractéristique. Ces résultats sur les champs permettent de retrouver le théorème de Drezet et Narasimhan (pour l'espace de modules grossier) et de montrer un énoncé analogue dans le cas G = Sp2r. Nous montrons aussi que le module grossier des SOr-fibrés n'est pas localement factoriel pour r ≥ 7.</p></abstract></profileDesc><revisionDesc><change when="1997-05-20">Modified</change><change when="1997">Published</change></revisionDesc></teiHeader></istex:fulltextTEI><json:item><extension>txt</extension><original>false</original><mimetype>text/plain</mimetype><uri>https://api.istex.fr/document/B3CF9F845D06279C40D7D9E46843832A9F73C6AC/fulltext/txt</uri></json:item></fulltext><metadata><istex:metadataXml wicri:clean="Elsevier, elements deleted: tail"><istex:xmlDeclaration>version="1.0" encoding="utf-8"</istex:xmlDeclaration><istex:docType PUBLIC="-//ES//DTD journal article DTD version 4.5.2//EN//XML" URI="art452.dtd" name="istex:docType"></istex:docType><istex:document><converted-article version="4.5.2" docsubtype="fla"><item-info><jid>ANSENS</jid><aid>97899296</aid><ce:pii>S0012-9593(97)89929-6</ce:pii><ce:doi>10.1016/S0012-9593(97)89929-6</ce:doi><ce:copyright type="unknown" year="1997"></ce:copyright></item-info><head><ce:title>The line bundles on the moduli of parabolic G-bundles over curves and their sections</ce:title><ce:author-group><ce:author><ce:given-name>Yves</ce:given-name><ce:surname>Laszlo</ce:surname><ce:e-address>laszlo@dmi.ens.fr</ce:e-address></ce:author><ce:affiliation><ce:textfn>DMI, École normale supérieure, 45, rue d'Ulm, 75230 Paris Cedex 05, France</ce:textfn></ce:affiliation></ce:author-group><ce:author-group><ce:author><ce:given-name>Christoph</ce:given-name><ce:surname>Sorger</ce:surname><ce:e-address>sorger@math.jussieu.fr</ce:e-address></ce:author><ce:affiliation><ce:textfn>Institut de Mathématiques Jussieu, Université Paris-VII, Case Postale 7012, 2, place Jussieu, 75251 Paris Cedex 05, France</ce:textfn></ce:affiliation></ce:author-group><ce:date-received day="28" month="3" year="1996"></ce:date-received><ce:date-revised day="20" month="5" year="1997"></ce:date-revised><ce:abstract xml:lang="fr"><ce:section-title>Résumé</ce:section-title><ce:abstract-sec><ce:simple-para>Soient <ce:italic>X</ce:italic> une courbe complexe, lisse, projective et connexe et <ce:italic>G</ce:italic> un groupe algébrique complexe, simple et simplement connexe. Nous calculons le groupe de Picard du champ des <ce:italic>G</ce:italic>-fibrés quasi-paraboliques sur <ce:italic>X</ce:italic>, décrivons explicitement ses générateurs pour <ce:italic>G</ce:italic> de type classique ou <ce:italic>G</ce:italic><ce:inf>2</ce:inf>, puis identifions les espaces de sections globales correspondants avec les espaces de vacua de Tsuchiya, Ueno et Yamada. La méthode utilise le théorème d'uniformisation qui décrit ces champs comme doubles quotients de certains groupes algébriques de dimension infinie. Nous décrivons le fibré dualisant du champ des <ce:italic>G</ce:italic>-fibrés et montrons qu'il admet une unique racine carrée, que nous construisons explicitement. Si <ce:italic>G</ce:italic> n'est pas simplement connexe, la racine carrée dépend du choix d'une thêta-caractéristique. Ces résultats sur les champs permettent de retrouver le théorème de Drezet et Narasimhan (pour l'espace de modules grossier) et de montrer un énoncé analogue dans le cas <ce:italic>G</ce:italic> = <ce:italic>Sp</ce:italic><ce:inf>2<ce:italic>r</ce:italic></ce:inf>. Nous montrons aussi que le module grossier des <ce:italic>SO<ce:inf>r</ce:inf></ce:italic>-fibrés n'est pas localement factoriel pour <ce:italic>r</ce:italic> ≥ 7.</ce:simple-para></ce:abstract-sec></ce:abstract><ce:abstract><ce:section-title>Abstract</ce:section-title><ce:abstract-sec><ce:simple-para>Let <ce:italic>X</ce:italic> be a complex, smooth, complete and connected curve and <ce:italic>G</ce:italic> be a complex simple and simply connected algebraic group. We compute the Picard group of the stack of quasi-parabolic <ce:italic>G</ce:italic>-bundles over <ce:italic>X</ce:italic>, describe explicitly its generators for classical <ce:italic>G</ce:italic> and <ce:italic>G</ce:italic><ce:inf>2</ce:inf> and then identify the corresponding spaces of global sections with the vacua spaces of Tsuchiya, Ueno and Yamada. The method uses the uniformization theorem which describes these stacks as double quotients of certain infinite dimensional algebraic groups. We describe also the dualizing bundle of the stack of <ce:italic>G</ce:italic>-bundles and show that it admits a unique square root, which we construct explicitly. If <ce:italic>G</ce:italic> is not simply connected, the square root depends on the choice of a theta-characteristic. These results about stacks allow to recover the Drezet-Narasimhan theorem (for the coarse moduli space) and to show an analogous statement when <ce:italic>G</ce:italic> = <ce:italic>Sp</ce:italic><ce:inf>2<ce:italic>r</ce:italic></ce:inf>. We prove also that the coarse moduli spaces of semi-stable <ce:italic>SO<ce:inf>r</ce:inf></ce:italic>-bundles are not locally factorial for <ce:italic>r</ce:italic> ≥ 7.</ce:simple-para></ce:abstract-sec></ce:abstract></head></converted-article></istex:document></istex:metadataXml><mods version="3.6"><titleInfo><title>The line bundles on the moduli of parabolic G-bundles over curves and their sections</title></titleInfo><titleInfo type="alternative" contentType="CDATA"><title>The line bundles on the moduli of parabolic G-bundles over curves and their sections</title></titleInfo><name type="personal"><namePart type="given">Yves</namePart><namePart type="family">Laszlo</namePart><affiliation>DMI, École normale supérieure, 45, rue d'Ulm, 75230 Paris Cedex 05, France</affiliation><affiliation>E-mail: laszlo@dmi.ens.fr</affiliation><role><roleTerm type="text">author</roleTerm></role></name><name type="personal"><namePart type="given">Christoph</namePart><namePart type="family">Sorger</namePart><affiliation>Institut de Mathématiques Jussieu, Université Paris-VII, Case Postale 7012, 2, place Jussieu, 75251 Paris Cedex 05, France</affiliation><affiliation>E-mail: laszlo@dmi.ens.fr</affiliation><role><roleTerm type="text">author</roleTerm></role></name><typeOfResource>text</typeOfResource><genre type="research-article" displayLabel="Full-length article" authority="ISTEX" authorityURI="https://content-type.data.istex.fr" valueURI="https://content-type.data.istex.fr/ark:/67375/XTP-1JC4F85T-7">research-article</genre><originInfo><publisher>ELSEVIER</publisher><dateIssued encoding="w3cdtf">1997</dateIssued><dateModified encoding="w3cdtf">1997-05-20</dateModified><copyrightDate encoding="w3cdtf">1997</copyrightDate></originInfo><language><languageTerm type="code" authority="iso639-2b">eng</languageTerm><languageTerm type="code" authority="rfc3066">en</languageTerm></language><abstract lang="en">Abstract: Let X be a complex, smooth, complete and connected curve and G be a complex simple and simply connected algebraic group. We compute the Picard group of the stack of quasi-parabolic G-bundles over X, describe explicitly its generators for classical G and G2 and then identify the corresponding spaces of global sections with the vacua spaces of Tsuchiya, Ueno and Yamada. The method uses the uniformization theorem which describes these stacks as double quotients of certain infinite dimensional algebraic groups. We describe also the dualizing bundle of the stack of G-bundles and show that it admits a unique square root, which we construct explicitly. If G is not simply connected, the square root depends on the choice of a theta-characteristic. These results about stacks allow to recover the Drezet-Narasimhan theorem (for the coarse moduli space) and to show an analogous statement when G = Sp2r. We prove also that the coarse moduli spaces of semi-stable SOr-bundles are not locally factorial for r ≥ 7.</abstract><abstract lang="fr">Résumé: Soient X une courbe complexe, lisse, projective et connexe et G un groupe algébrique complexe, simple et simplement connexe. Nous calculons le groupe de Picard du champ des G-fibrés quasi-paraboliques sur X, décrivons explicitement ses générateurs pour G de type classique ou G2, puis identifions les espaces de sections globales correspondants avec les espaces de vacua de Tsuchiya, Ueno et Yamada. La méthode utilise le théorème d'uniformisation qui décrit ces champs comme doubles quotients de certains groupes algébriques de dimension infinie. Nous décrivons le fibré dualisant du champ des G-fibrés et montrons qu'il admet une unique racine carrée, que nous construisons explicitement. Si G n'est pas simplement connexe, la racine carrée dépend du choix d'une thêta-caractéristique. Ces résultats sur les champs permettent de retrouver le théorème de Drezet et Narasimhan (pour l'espace de modules grossier) et de montrer un énoncé analogue dans le cas G = Sp2r. Nous montrons aussi que le module grossier des SOr-fibrés n'est pas localement factoriel pour r ≥ 7.</abstract><relatedItem type="host"><titleInfo><title>Annales scientifiques de l'Ecole normale superieure</title></titleInfo><titleInfo type="abbreviated"><title>ANSENS</title></titleInfo><genre type="journal" authority="ISTEX" authorityURI="https://publication-type.data.istex.fr" valueURI="https://publication-type.data.istex.fr/ark:/67375/JMC-0GLKJH51-B">journal</genre><originInfo><publisher>ELSEVIER</publisher><dateIssued encoding="w3cdtf">1997</dateIssued></originInfo><identifier type="ISSN">0012-9593</identifier><identifier type="PII">S0012-9593(00)X0003-1</identifier><part><date>1997</date><detail type="volume"><number>30</number><caption>vol.</caption></detail><detail type="issue"><number>4</number><caption>no.</caption></detail><extent unit="issue-pages"><start>417</start><end>552</end></extent><extent unit="pages"><start>499</start><end>525</end></extent></part></relatedItem><identifier type="istex">B3CF9F845D06279C40D7D9E46843832A9F73C6AC</identifier><identifier type="ark">ark:/67375/6H6-F83ZVLWC-B</identifier><identifier type="DOI">10.1016/S0012-9593(97)89929-6</identifier><identifier type="PII">S0012-9593(97)89929-6</identifier><recordInfo><recordContentSource authority="ISTEX" authorityURI="https://loaded-corpus.data.istex.fr" valueURI="https://loaded-corpus.data.istex.fr/ark:/67375/XBH-HKKZVM7B-M">elsevier</recordContentSource></recordInfo></mods><json:item><extension>json</extension><original>false</original><mimetype>application/json</mimetype><uri>https://api.istex.fr/document/B3CF9F845D06279C40D7D9E46843832A9F73C6AC/metadata/json</uri></json:item></metadata></istex></record>Pour manipuler ce document sous Unix (Dilib)
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